A particle is undergoing circular motion with angular frequency ω as shown
If the shadow of the particle on the wall is performing SHM such that its acceleration's maximum value is 'a', find the acceleration of the particle and the radius of the circle.
The particle doing circular motion has a centripetal acceleration. The component of this acceleration parallel to the wall is the
acceleration of the shadow.
In the above diagram the acceleration of the shadow as is given by ac cosθ. It will be maximum when cosθ = 1 i.e., in the extreme position. Here, asmax = ac
Given in the problem is that max acceleration of the shadow is a so asmax = a = ac The acceleration of the particle doing circular motion is 'a' Also as we know, mac=mω2r
⇒ ma=mω2r⇒ ω2r=a
R=aω2